Fractals

Fractal Geometry. (a) The shape can be decomposed into pieces, each scaled by a factor of Consequently, Note this fractal and the Sierpinski gasket have the same similarity dimension.

Not surprisingly, dimension alone does not always distinguish one fractal from another. (b) The shape can be decomposed into pieces, each scaled by a factor of Consequently, This fractal is called the Sierpinski carpet. (c) The shape can be decomposed into pieces, each scaled by a factor of r = Consequently, Note this fractal is gotten from example (b) by removing the top middle (red) piece.
Black and White Fractals That Capture Creativity. Fractal Software : FractalFoundation.org. We believe that the best way to learn about fractals is to explore them yourself!

Please download the fractal software below and begin to explore the infinite realm of fractals. XaoS for Windows | XaoS for Mac OS X | Instructions for XaoS | XaoS Open Source ProjectThis is the dazzling Real-Time Zoomer featured in our presentations. Explore the Mandelbrot set and 23 other fractals. Used by children everywhere, it’s even simple enough for adults. Free! Mandelbulber | Mandelbulb3D If you’re ready to explore 3D fractals like the Mandelbulb and Mandelbox, here are two great free programs that will open up infinite worlds. Ultra FractalWhen you are ready for more power, Ultra Fractal is an awesome, professional package that supports animation, arbitrarily deep fractals, and extremely high resolution.

With this immersive installation, French artist Serge Salat invites visitors to take a journey through endless layers of space, decked out with cubic shapes, panels of mirrors, shifting lights and music.

“Beyond Infinity” is a multi-sensory, multimedia experience that blends Eastern Chinese with Western Renaissance. Inspired by the Suzhou Gardens, a masterpiece of Chinese landscape, the three-lined trigram of I Ching is the main pattern that organizes the space of the work. Salat uses mirrors as optical illusions, exploding a single room into spatial infinity. via [Architizer] Views: 422998. Mini Post-It sponge. Fractal_Love_by_Shortgreenpigg.jpg (1600×1200)
La matière est faite d'ondes.

Discovery[edit] The Buddhabrot rendering technique was discovered and later described in a 1993 Usenet post to sci.fractals[1] by Melinda Green.[2] Previous researchers had come very close to finding the precise Buddhabrot technique. In 1988 Linas Vepstas relayed similar images to Cliff Pickover for inclusion in Pickover's forthcoming book Computers, Pattern, Chaos, and Beauty. This led directly to the discovery of pickover stalks. Rendering method[edit] in the complex plane for which the iteratively defined sequence does not tend to infinity as goes to infinity for The Buddhabrot image can be constructed by first creating a 2-dimensional array of boxes, each corresponding to a final pixel in the image.